Минимални кораци за достизање циља витезом | Сет 2
С обзиром на квадратну шаховску таблу величине Н к Н, позиција витеза и позиција мете добијају задатак да открију минималне кораке које ће витез предузети да дође до циљне позиције.
Примери:
Input : (2 4) - knight's position (6 4) - target cell Output : 2 Input : (4 5) (1 1) Output : 3
Приступ БФС-а за решавање горњег проблема је већ разматран у претходни пост. У овом посту се говори о решењу за динамичко програмирање.
Објашњење приступа:
Нека шаховска табла 8 к 8 ћелија. Сада рецимо да је витез на (3 3), а мета на (7 8). Могуће је 8 потеза са тренутне позиције витеза, тј. (2 1) (1 2) (4 1) (1 4) (5 2) (2 5) (5 4) (4 5). Али међу овим само два потеза (5 4) и (4 5) биће ка мети, а сви остали се удаљују од мете. Дакле, за проналажење минималних корака идите на (4 5) или (5 4). Сада израчунајте минималне кораке предузете од (4 5) и (5 4) да бисте дошли до циља. Ово се израчунава динамичким програмирањем. Дакле, ово резултира минималним корацима од (3 3) до (7 8).
Нека шаховска табла 8 к 8 ћелија. Сада рецимо да је витез на (4 3), а мета на (4 7). Могуће је 8 потеза али према мети постоје само 4 потеза, тј. (5 5) (3 5) (2 4) (6 4). Како је (5 5) еквивалентно (3 5) и (2 4) је еквивалентно (6 4). Дакле, из ове 4 тачке може се претворити у 2 бода. Узимајући (5 5) и (6 4) (овде). Сада израчунајте минималне кораке предузете од ове две тачке да бисте дошли до циља. Ово се израчунава динамичким програмирањем. Дакле, ово резултира минималним корацима од (4 3) до (4 7).
Изузетак: Када ће витез бити у углу и мета је таква да је разлика к и и координата са положајем витеза (1 1) или обрнуто. Тада ће минимални кораци бити 4.
Једначина динамичког програмирања:
1) дп[диффОфКс][диффОфИ] је минимални кораци предузети од позиције витеза до позиције мете.
2) дп[диффОфКс][диффОфИ] = дп[диффОфИ][диффОфКс] .
где је диффОфКс = разлика између к-координате витеза и к-координате мете
диффОфИ = разлика између и-координате витеза и и-координате мете
Испод је примена горњег приступа:
// C++ code for minimum steps for // a knight to reach target position #include using namespace std ; // initializing the matrix. int dp [ 8 ][ 8 ] = { 0 }; int getsteps ( int x int y int tx int ty ) { // if knight is on the target // position return 0. if ( x == tx && y == ty ) return dp [ 0 ][ 0 ]; else { // if already calculated then return // that value. Taking absolute difference. if ( dp [ abs ( x - tx )][ abs ( y - ty )] != 0 ) return dp [ abs ( x - tx )][ abs ( y - ty )]; else { // there will be two distinct positions // from the knight towards a target. // if the target is in same row or column // as of knight then there can be four // positions towards the target but in that // two would be the same and the other two // would be the same. int x1 y1 x2 y2 ; // (x1 y1) and (x2 y2) are two positions. // these can be different according to situation. // From position of knight the chess board can be // divided into four blocks i.e.. N-E E-S S-W W-N . if ( x <= tx ) { if ( y <= ty ) { x1 = x + 2 ; y1 = y + 1 ; x2 = x + 1 ; y2 = y + 2 ; } else { x1 = x + 2 ; y1 = y - 1 ; x2 = x + 1 ; y2 = y - 2 ; } } else { if ( y <= ty ) { x1 = x - 2 ; y1 = y + 1 ; x2 = x - 1 ; y2 = y + 2 ; } else { x1 = x - 2 ; y1 = y - 1 ; x2 = x - 1 ; y2 = y - 2 ; } } // ans will be 1 + minimum of steps // required from (x1 y1) and (x2 y2). dp [ abs ( x - tx )][ abs ( y - ty )] = min ( getsteps ( x1 y1 tx ty ) getsteps ( x2 y2 tx ty )) + 1 ; // exchanging the coordinates x with y of both // knight and target will result in same ans. dp [ abs ( y - ty )][ abs ( x - tx )] = dp [ abs ( x - tx )][ abs ( y - ty )]; return dp [ abs ( x - tx )][ abs ( y - ty )]; } } } // Driver Code int main () { int i n x y tx ty ans ; // size of chess board n*n n = 100 ; // (x y) coordinate of the knight. // (tx ty) coordinate of the target position. x = 4 ; y = 5 ; tx = 1 ; ty = 1 ; // (Exception) these are the four corner points // for which the minimum steps is 4. if (( x == 1 && y == 1 && tx == 2 && ty == 2 ) || ( x == 2 && y == 2 && tx == 1 && ty == 1 )) ans = 4 ; else if (( x == 1 && y == n && tx == 2 && ty == n - 1 ) || ( x == 2 && y == n - 1 && tx == 1 && ty == n )) ans = 4 ; else if (( x == n && y == 1 && tx == n - 1 && ty == 2 ) || ( x == n - 1 && y == 2 && tx == n && ty == 1 )) ans = 4 ; else if (( x == n && y == n && tx == n - 1 && ty == n - 1 ) || ( x == n - 1 && y == n - 1 && tx == n && ty == n )) ans = 4 ; else { // dp[a][b] here a b is the difference of // x & tx and y & ty respectively. dp [ 1 ][ 0 ] = 3 ; dp [ 0 ][ 1 ] = 3 ; dp [ 1 ][ 1 ] = 2 ; dp [ 2 ][ 0 ] = 2 ; dp [ 0 ][ 2 ] = 2 ; dp [ 2 ][ 1 ] = 1 ; dp [ 1 ][ 2 ] = 1 ; ans = getsteps ( x y tx ty ); } cout < < ans < < endl ; return 0 ; }
Java //Java code for minimum steps for // a knight to reach target position public class GFG { // initializing the matrix. static int dp [][] = new int [ 8 ][ 8 ] ; static int getsteps ( int x int y int tx int ty ) { // if knight is on the target // position return 0. if ( x == tx && y == ty ) { return dp [ 0 ][ 0 ] ; } else // if already calculated then return // that value. Taking absolute difference. if ( dp [ Math . abs ( x - tx ) ][ Math . abs ( y - ty ) ] != 0 ) { return dp [ Math . abs ( x - tx ) ][ Math . abs ( y - ty ) ] ; } else { // there will be two distinct positions // from the knight towards a target. // if the target is in same row or column // as of knight then there can be four // positions towards the target but in that // two would be the same and the other two // would be the same. int x1 y1 x2 y2 ; // (x1 y1) and (x2 y2) are two positions. // these can be different according to situation. // From position of knight the chess board can be // divided into four blocks i.e.. N-E E-S S-W W-N . if ( x <= tx ) { if ( y <= ty ) { x1 = x + 2 ; y1 = y + 1 ; x2 = x + 1 ; y2 = y + 2 ; } else { x1 = x + 2 ; y1 = y - 1 ; x2 = x + 1 ; y2 = y - 2 ; } } else if ( y <= ty ) { x1 = x - 2 ; y1 = y + 1 ; x2 = x - 1 ; y2 = y + 2 ; } else { x1 = x - 2 ; y1 = y - 1 ; x2 = x - 1 ; y2 = y - 2 ; } // ans will be 1 + minimum of steps // required from (x1 y1) and (x2 y2). dp [ Math . abs ( x - tx ) ][ Math . abs ( y - ty ) ] = Math . min ( getsteps ( x1 y1 tx ty ) getsteps ( x2 y2 tx ty )) + 1 ; // exchanging the coordinates x with y of both // knight and target will result in same ans. dp [ Math . abs ( y - ty ) ][ Math . abs ( x - tx ) ] = dp [ Math . abs ( x - tx ) ][ Math . abs ( y - ty ) ] ; return dp [ Math . abs ( x - tx ) ][ Math . abs ( y - ty ) ] ; } } // Driver Code static public void main ( String [] args ) { int i n x y tx ty ans ; // size of chess board n*n n = 100 ; // (x y) coordinate of the knight. // (tx ty) coordinate of the target position. x = 4 ; y = 5 ; tx = 1 ; ty = 1 ; // (Exception) these are the four corner points // for which the minimum steps is 4. if (( x == 1 && y == 1 && tx == 2 && ty == 2 ) || ( x == 2 && y == 2 && tx == 1 && ty == 1 )) { ans = 4 ; } else if (( x == 1 && y == n && tx == 2 && ty == n - 1 ) || ( x == 2 && y == n - 1 && tx == 1 && ty == n )) { ans = 4 ; } else if (( x == n && y == 1 && tx == n - 1 && ty == 2 ) || ( x == n - 1 && y == 2 && tx == n && ty == 1 )) { ans = 4 ; } else if (( x == n && y == n && tx == n - 1 && ty == n - 1 ) || ( x == n - 1 && y == n - 1 && tx == n && ty == n )) { ans = 4 ; } else { // dp[a][b] here a b is the difference of // x & tx and y & ty respectively. dp [ 1 ][ 0 ] = 3 ; dp [ 0 ][ 1 ] = 3 ; dp [ 1 ][ 1 ] = 2 ; dp [ 2 ][ 0 ] = 2 ; dp [ 0 ][ 2 ] = 2 ; dp [ 2 ][ 1 ] = 1 ; dp [ 1 ][ 2 ] = 1 ; ans = getsteps ( x y tx ty ); } System . out . println ( ans ); } } /*This code is contributed by PrinciRaj1992*/
Python3 # Python3 code for minimum steps for # a knight to reach target position # initializing the matrix. dp = [[ 0 for i in range ( 8 )] for j in range ( 8 )]; def getsteps ( x y tx ty ): # if knight is on the target # position return 0. if ( x == tx and y == ty ): return dp [ 0 ][ 0 ]; # if already calculated then return # that value. Taking absolute difference. elif ( dp [ abs ( x - tx )][ abs ( y - ty )] != 0 ): return dp [ abs ( x - tx )][ abs ( y - ty )]; else : # there will be two distinct positions # from the knight towards a target. # if the target is in same row or column # as of knight then there can be four # positions towards the target but in that # two would be the same and the other two # would be the same. x1 y1 x2 y2 = 0 0 0 0 ; # (x1 y1) and (x2 y2) are two positions. # these can be different according to situation. # From position of knight the chess board can be # divided into four blocks i.e.. N-E E-S S-W W-N . if ( x <= tx ): if ( y <= ty ): x1 = x + 2 ; y1 = y + 1 ; x2 = x + 1 ; y2 = y + 2 ; else : x1 = x + 2 ; y1 = y - 1 ; x2 = x + 1 ; y2 = y - 2 ; elif ( y <= ty ): x1 = x - 2 ; y1 = y + 1 ; x2 = x - 1 ; y2 = y + 2 ; else : x1 = x - 2 ; y1 = y - 1 ; x2 = x - 1 ; y2 = y - 2 ; # ans will be 1 + minimum of steps # required from (x1 y1) and (x2 y2). dp [ abs ( x - tx )][ abs ( y - ty )] = min ( getsteps ( x1 y1 tx ty ) getsteps ( x2 y2 tx ty )) + 1 ; # exchanging the coordinates x with y of both # knight and target will result in same ans. dp [ abs ( y - ty )][ abs ( x - tx )] = dp [ abs ( x - tx )][ abs ( y - ty )]; return dp [ abs ( x - tx )][ abs ( y - ty )]; # Driver Code if __name__ == '__main__' : # size of chess board n*n n = 100 ; # (x y) coordinate of the knight. # (tx ty) coordinate of the target position. x = 4 ; y = 5 ; tx = 1 ; ty = 1 ; # (Exception) these are the four corner points # for which the minimum steps is 4. if (( x == 1 and y == 1 and tx == 2 and ty == 2 ) or ( x == 2 and y == 2 and tx == 1 and ty == 1 )): ans = 4 ; elif (( x == 1 and y == n and tx == 2 and ty == n - 1 ) or ( x == 2 and y == n - 1 and tx == 1 and ty == n )): ans = 4 ; elif (( x == n and y == 1 and tx == n - 1 and ty == 2 ) or ( x == n - 1 and y == 2 and tx == n and ty == 1 )): ans = 4 ; elif (( x == n and y == n and tx == n - 1 and ty == n - 1 ) or ( x == n - 1 and y == n - 1 and tx == n and ty == n )): ans = 4 ; else : # dp[a][b] here a b is the difference of # x & tx and y & ty respectively. dp [ 1 ][ 0 ] = 3 ; dp [ 0 ][ 1 ] = 3 ; dp [ 1 ][ 1 ] = 2 ; dp [ 2 ][ 0 ] = 2 ; dp [ 0 ][ 2 ] = 2 ; dp [ 2 ][ 1 ] = 1 ; dp [ 1 ][ 2 ] = 1 ; ans = getsteps ( x y tx ty ); print ( ans ); # This code is contributed by PrinciRaj1992
C# // C# code for minimum steps for // a knight to reach target position using System ; public class GFG { // initializing the matrix. static int [ ] dp = new int [ 8 8 ]; static int getsteps ( int x int y int tx int ty ) { // if knight is on the target // position return 0. if ( x == tx && y == ty ) { return dp [ 0 0 ]; } else // if already calculated then return // that value. Taking Absolute difference. if ( dp [ Math . Abs ( x - tx ) Math . Abs ( y - ty )] != 0 ) { return dp [ Math . Abs ( x - tx ) Math . Abs ( y - ty )]; } else { // there will be two distinct positions // from the knight towards a target. // if the target is in same row or column // as of knight then there can be four // positions towards the target but in that // two would be the same and the other two // would be the same. int x1 y1 x2 y2 ; // (x1 y1) and (x2 y2) are two positions. // these can be different according to situation. // From position of knight the chess board can be // divided into four blocks i.e.. N-E E-S S-W W-N . if ( x <= tx ) { if ( y <= ty ) { x1 = x + 2 ; y1 = y + 1 ; x2 = x + 1 ; y2 = y + 2 ; } else { x1 = x + 2 ; y1 = y - 1 ; x2 = x + 1 ; y2 = y - 2 ; } } else if ( y <= ty ) { x1 = x - 2 ; y1 = y + 1 ; x2 = x - 1 ; y2 = y + 2 ; } else { x1 = x - 2 ; y1 = y - 1 ; x2 = x - 1 ; y2 = y - 2 ; } // ans will be 1 + minimum of steps // required from (x1 y1) and (x2 y2). dp [ Math . Abs ( x - tx ) Math . Abs ( y - ty )] = Math . Min ( getsteps ( x1 y1 tx ty ) getsteps ( x2 y2 tx ty )) + 1 ; // exchanging the coordinates x with y of both // knight and target will result in same ans. dp [ Math . Abs ( y - ty ) Math . Abs ( x - tx )] = dp [ Math . Abs ( x - tx ) Math . Abs ( y - ty )]; return dp [ Math . Abs ( x - tx ) Math . Abs ( y - ty )]; } } // Driver Code static public void Main () { int i n x y tx ty ans ; // size of chess board n*n n = 100 ; // (x y) coordinate of the knight. // (tx ty) coordinate of the target position. x = 4 ; y = 5 ; tx = 1 ; ty = 1 ; // (Exception) these are the four corner points // for which the minimum steps is 4. if (( x == 1 && y == 1 && tx == 2 && ty == 2 ) || ( x == 2 && y == 2 && tx == 1 && ty == 1 )) { ans = 4 ; } else if (( x == 1 && y == n && tx == 2 && ty == n - 1 ) || ( x == 2 && y == n - 1 && tx == 1 && ty == n )) { ans = 4 ; } else if (( x == n && y == 1 && tx == n - 1 && ty == 2 ) || ( x == n - 1 && y == 2 && tx == n && ty == 1 )) { ans = 4 ; } else if (( x == n && y == n && tx == n - 1 && ty == n - 1 ) || ( x == n - 1 && y == n - 1 && tx == n && ty == n )) { ans = 4 ; } else { // dp[a b] here a b is the difference of // x & tx and y & ty respectively. dp [ 1 0 ] = 3 ; dp [ 0 1 ] = 3 ; dp [ 1 1 ] = 2 ; dp [ 2 0 ] = 2 ; dp [ 0 2 ] = 2 ; dp [ 2 1 ] = 1 ; dp [ 1 2 ] = 1 ; ans = getsteps ( x y tx ty ); } Console . WriteLine ( ans ); } } /*This code is contributed by PrinciRaj1992*/
JavaScript < script > // JavaScript code for minimum steps for // a knight to reach target position // initializing the matrix. let dp = new Array ( 8 ) for ( let i = 0 ; i < 8 ; i ++ ){ dp [ i ] = new Array ( 8 ). fill ( 0 ) } function getsteps ( x y tx ty ) { // if knight is on the target // position return 0. if ( x == tx && y == ty ) return dp [ 0 ][ 0 ]; else { // if already calculated then return // that value. Taking absolute difference. if ( dp [( Math . abs ( x - tx ))][( Math . abs ( y - ty ))] != 0 ) return dp [( Math . abs ( x - tx ))][( Math . abs ( y - ty ))]; else { // there will be two distinct positions // from the knight towards a target. // if the target is in same row or column // as of knight then there can be four // positions towards the target but in that // two would be the same and the other two // would be the same. let x1 y1 x2 y2 ; // (x1 y1) and (x2 y2) are two positions. // these can be different according to situation. // From position of knight the chess board can be // divided into four blocks i.e.. N-E E-S S-W W-N . if ( x <= tx ) { if ( y <= ty ) { x1 = x + 2 ; y1 = y + 1 ; x2 = x + 1 ; y2 = y + 2 ; } else { x1 = x + 2 ; y1 = y - 1 ; x2 = x + 1 ; y2 = y - 2 ; } } else { if ( y <= ty ) { x1 = x - 2 ; y1 = y + 1 ; x2 = x - 1 ; y2 = y + 2 ; } else { x1 = x - 2 ; y1 = y - 1 ; x2 = x - 1 ; y2 = y - 2 ; } } // ans will be 1 + minimum of steps // required from (x1 y1) and (x2 y2). dp [( Math . abs ( x - tx ))][( Math . abs ( y - ty ))] = Math . min ( getsteps ( x1 y1 tx ty ) getsteps ( x2 y2 tx ty )) + 1 ; // exchanging the coordinates x with y of both // knight and target will result in same ans. dp [( Math . abs ( y - ty ))][( Math . abs ( x - tx ))] = dp [( Math . abs ( x - tx ))][( Math . abs ( y - ty ))]; return dp [( Math . abs ( x - tx ))][( Math . abs ( y - ty ))]; } } } // Driver Code let i n x y tx ty ans ; // size of chess board n*n n = 100 ; // (x y) coordinate of the knight. // (tx ty) coordinate of the target position. x = 4 ; y = 5 ; tx = 1 ; ty = 1 ; // (Exception) these are the four corner points // for which the minimum steps is 4. if (( x == 1 && y == 1 && tx == 2 && ty == 2 ) || ( x == 2 && y == 2 && tx == 1 && ty == 1 )) ans = 4 ; else if (( x == 1 && y == n && tx == 2 && ty == n - 1 ) || ( x == 2 && y == n - 1 && tx == 1 && ty == n )) ans = 4 ; else if (( x == n && y == 1 && tx == n - 1 && ty == 2 ) || ( x == n - 1 && y == 2 && tx == n && ty == 1 )) ans = 4 ; else if (( x == n && y == n && tx == n - 1 && ty == n - 1 ) || ( x == n - 1 && y == n - 1 && tx == n && ty == n )) ans = 4 ; else { // dp[a][b] here a b is the difference of // x & tx and y & ty respectively. dp [ 1 ][ 0 ] = 3 ; dp [ 0 ][ 1 ] = 3 ; dp [ 1 ][ 1 ] = 2 ; dp [ 2 ][ 0 ] = 2 ; dp [ 0 ][ 2 ] = 2 ; dp [ 2 ][ 1 ] = 1 ; dp [ 1 ][ 2 ] = 1 ; ans = getsteps ( x y tx ty ); } document . write ( ans ' ' ); // This code is contributed by shinjanpatra. < /script>
Излаз:
3
Временска сложеност: О(Н * М) где је Н укупан број редова, а М укупан број колона
Помоћни простор: О (Н * М)
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